Mathematics – General Topology
Scientific paper
2009-04-20
Fundamenta Mathematicae , 206 (2009), 77-111
Mathematics
General Topology
37 pages; one figure
Scientific paper
It is known that every homeomorphism of the plane has a fixed point in a non-separating, invariant subcontinuum. Easy examples show that a branched covering map of the plane can be periodic point free. In this paper we show that any branched covering map of the plane of degree with absolute value at most two, which has an invariant, non-separating continuum $Y$, either has a fixed point in $Y$, or $Y$ contains a \emph{minimal (by inclusion among invariant continua), fully invariant, non-separating} subcontinuum $X$. In the latter case, $f$ has to be of degree -2 and $X$ has exactly three fixed prime ends, one corresponding to an \emph{outchannel} and the other two to \emph{inchannels}.
Blokh Alexander
Oversteegen Lex
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